Proof using delta-epsilon method: Is it correct?

I don't understand your derivations, but the answer to the exercise, i.e. ϵ/5\epsilon/5, looks wrong. To see that pick a small ϵ\epsilon, e.g. 0.001, compute values of λ2+λ\lambda^2+\lambda for λ=3±ϵ5\lambda = 3\pm \frac{\epsilon}{5} and check whether they fit in the (12ϵ,12+ϵ)(12-\epsilon,12+\epsilon) interval.
 
blamocur said:
I don't understand your derivations, but the answer to the exercise, i.e. ϵ/5\epsilon/5, looks wrong. To see that pick a small ϵ\epsilon, e.g. 0.001, compute values of λ2+λ\lambda^2+\lambda for λ=3±ϵ5\lambda = 3\pm \frac{\epsilon}{5} and check whether they fit in the (12ϵ,12+ϵ)(12-\epsilon,12+\epsilon) interval.
Click to expand...

Thanks! I have revised my earlier solution. Would especially appreciate to know if it is okay to assume x+4 <= 8 when strictly it is x+4< 8. I have solved assuming both.
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DigitalSplendid said:
Would especially appreciate to know if it is okay to assume x+4 <= 8 when strictly it is x+4< 8.
Click to expand...
I don't understand why it matters. Moreover, I don't understand how you deduce that λ3>8ϵ|\lambda-3| > 8\epsilon from the assumption that λ+4<8|\lambda+4| < 8.
To be able to help I'd need to see two things:
- The exact statement of the problem you are solving
- Step by step reasoning leading to your answer; numbering those steps would make the discussion easier and more productive.
 
blamocur said:
I don't understand why it matters. Moreover, I don't understand how you deduce that λ3>8ϵ|\lambda-3| > 8\epsilon from the assumption that λ+4<8|\lambda+4| < 8.
To be able to help I'd need to see two things:
- The exact statement of the problem you are solving
- Step by step reasoning leading to your answer; numbering those steps would make the discussion easier and more productive.
Click to expand...
Sorry!

It is x - 3 and not delta - 3. Similarly x + 4 and not delta + 4.
 
blamocur said:
I don't understand your derivations, but the answer to the exercise, i.e. ϵ/5\epsilon/5, looks wrong. To see that pick a small ϵ\epsilon, e.g. 0.001, compute values of λ2+λ\lambda^2+\lambda for λ=3±ϵ5\lambda = 3\pm \frac{\epsilon}{5} and check whether they fit in the (12ϵ,12+ϵ)(12-\epsilon,12+\epsilon) interval.
Click to expand...
DigitalSplendid said:
Sorry!

It is x - 3 and not delta - 3. Similarly x + 4 and not delta + 4.
Click to expand...
1738674238451.png
Solving problem no. 32.

1738674308579.png
 
After finding the book online to double-check that 1.4.1 is the standard delta-epsilon definition of limits I still believe that their answer is wrong and yours, i.e, δ<ϵ/8\delta < \epsilon/8, is correct. They seem to assume that x+4<5|x+4|<5, probably by confusing xx with δ\delta. Things happen :)
 
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